Micro 1010 Chapter 3
Now suppose that you have a summer job that pays you $15 per hour. How would your analysis change? With a $15-per-hour summer job,
the opportunity cost of your time would increase.
If opportunity cost were to suddenly increase, total cost would
increase and net benefit would decrease.
In general, apartment rental prices ________ as the opportunity cost of commuting rises, indicating a strong ________ relationship between rents and commutes.
increase; negative
Maria can purchase shirts for $22.00 each. She considers the benefit of one shirt to be $45.00, but with each additional shirt she purchases the benefit decreases by $5. According to the Principle of Optimization at the Margin, Maria will purchase ______ shirts. (Enter your response as a whole number.)
5; $45-$22/$5=4.6
A company mines 420,000 tons of coal per year in a rural county. The coal is worth $77 per ton. The average price for a 2,000-square-foot house with three bedrooms more than 20 km away from the mining site in this county is $210,000. The average price for a similar, 2,000-square-foot house with three bedrooms within 4 km of the mine is 5 percent lower. Using comparative statics, what is the effect of mining on home prices in this county? Mining changes the price of a 2,000-square-foot home (with three bedrooms) by $ . (Round your response to two decimal places and use a negative sign if necessary.)
$210,000 x 5%= -10,500 $−10,500
You are considering renting a city apartment with 1,000 square feet for $1,300 per month. The monthly rent on a larger, 1,500-square-foot city apartment is $1,750. The marginal cost of renting an apartment with 500 additional square feet is $_____ per square foot per month. (Round your response to two decimal places.)
(1750-1300)/(1500-1000)= 0.9
Suppose your total benefit from eating slices of pizza (value in dollars) is 10x−x^2, where x is the number of slices of pizza. Pizza is sold by the slice and costs $2 per slice, and so the total cost of pizza is 2x. Using optimization in levels, what is the optimal amount of pizza for you to eat? Your net benefit is maximized at nothing slices of pizza. (Enter your response as an integer.)
10x-x^2-2x => 8x-x^2 take derivative of both to get 8-2x=0 => Then 8/2=>4=x
You are a professor of economics at a university. You've been offered the position of serving as department head, which comes with an annual salary that is $5,500 higher than your current salary. However, the position will require you to work 200 additional hours per year. Suppose the next best use of your time is spending it with your family, which has value of $20 per hour. What is the difference in the net benefit from becoming the department head? The change in net benefit is $_____. (Enter your response as an integer.) To optimize, you _______become a department head.
20*200=4000 5500-4000=1500 1500; should
Assume that the average price for a 2,000-square-foot house in the city is $360,000 and the average rent for a 2,000-square-foot apartment in the city is $1,100 per month. Also assume that the average price for a 2,000-square-foot house in the suburbs is $250,000, the average price for a 2,000-square-foot house in the county is $370,000, and the average price for a 3,000-square-foot house in the suburbs is $500,000. Using comparative statics and the information above, what is the best estimate of the effect of living in the city (relative to living in the suburbs) on home prices? Living in the city changes home prices by $____. (Round your response to two decimal places.)
360,000-250,000=110,000
Your total benefits from spending time with your spouse are shown in the following table. Hours per Day Total Benefit Alternatively, you have the option of working as many hours as you want, earning $11 per hour. Assume this is the next best use of your time. Use the marginal principle to find your optimal number of hours to spend with your spouse per day. The optimal amount of time for you to spend with your spouse is _______hours per day. (Enter your response as an integer.)
4
You have been invited to play a 4-hour round of golf that has a value to you of $50. The total price to play the round of golf is $45. The net benefit of the round of golf is $___. (Enter your response as an integer.) Now assume that you have a job that pays you $12 per hour. Would you be optimizing to accept the invitation to play golf? To optimize, you should not______ golf.
5; not play
Research was conducted by professor Jobs to check which one program out of three given programs is the optimal choice for a student. The three options are a 6 month, a 12 month, or a 15 month program. Important information considered by the professor in his research is how much a student pays in tuition and fees for a given program within different time spans. The program is intensive, so it can be completed faster but at higher costs. The three programs yield the same benefit for the student. The program can be completed in 6 months, 12 months, or 15 months. The tuition and fees are $38,600, $35,000 and $28,600 respectively. Professor Jobs assumes the opportunity cost of time to a student for the program is $2,000 per month If professor Jobs assumes the opportunity cost of time to a student for the program is $500 per month instead of $2,000 per month, then the $2,000 per month cost curve lies ______the $500 per month cost curve. The optimal program for students when the opportunity cost of time for the program is $500 per month___________________when compared to the scenario with the opportunity cost of time is $2,000 per month.
6months x 2000= 12000 +38600=50600 12months x2000=24000+35000=59000 15montherx2000=30000+28600=58600 above switches to 15 month program Program 1 is the best program for the student with an opportunity cost of time of $2,000 per month. This program has the lowest total cost by taking into account both direct cost of tuition and fees and indirect time costs of the program. Therefore, Program 1 is the optimal choice for student. To optimize, it is necessary to convert all of the costs and benefits into common units. The time cost of a program is calculated by using the student's opportunity cost of time, which is $500 per month. Programs Program time span (months) Time cost of a program Tuition and fees Total cost: Time cost of a programplus+Tuition and fees 1 6 months 6 times $ 500 equals $ 3 comma 0006×$500=$3,000 $38,600 $ 3 comma 000 plus $ 38 comma 600 equals $ 41 comma 600$3,000+$38,600=$41,600 2 12 months 12 times $ 500 equals $ 6 comma 00012×$500=$6,000 $35,000 $ 6 comma 000 plus $ 35 comma 000 equals $ 41 comma 000$6,000+$35,000=$41,000 3 15 months 15 times $ 500 equals $ 7 comma 50015×$500=$7,500 $28,600 $ 7 comma 500 plus $ 28 comma 600 equals $ 36 comma 100$7,500+$28,600=$36,100 The $500 curve has lower time costs for each program, so the total cost, which takes into account both the direct cost of tuition and fees and the indirect cost of time, is lower for all programs compared to the time cost for each program with an opportunity cost of $2,000 per month. Therefore, the $2,000 per month cost curve lies above the $500 per month cost curve. Program 3 is the best program for the student with an opportunity cost of time of $500 per month. Therefore, the optimal program for students with an opportunity cost of $500 per month switched to 15 month program when compared to the scenario with the opportunity cost of $2,000 per month.
Which one of the following is common between optimization using total value and optimization using marginal analysis? A.It is a cost-benefit analysis technique for optimization. B.It calculates the change in total value and chooses the option with the highest total value as a best feasible option. C.It calculates the extra cost generated by moving from one feasible alternative to the next feasible alternative. D.It excludes the information that is not relevant to the decision.
A.It is a cost-benefit analysis technique for optimization. There are two cost-benefit analysis techniques for optimization. The first technique simply calculates the total value of each feasible option and then picks the option with the greatest total value. The second technique is marginal analysis and reminds you to exclude information that is not relevant to your decision. The marginal cost is the extra cost generated by moving from one feasible alternative to the next feasible alternative. It focuses on the differences among the feasible options and chooses the option with the highest total value as a best feasible option.
Which of the following statements regarding marginal analysis are true? (Check all that apply.) A.It is often faster to implement than optimization using total value. B.It always picks out a different optimum than the minimization of the total cost. C.It focuses on the difference between one feasible alternative and the next feasible alternative. D.It excludes information that is relevant to the individual's decision.
A.It is often faster to implement than optimization using total value. C.It focuses on the difference between one feasible alternative and the next feasible alternative.
Marginal analysis always picks out the same optimum as minimization of total cost.
Always; the same
Suppose there are four products that Samuel can purchase. Samuel obtains a discount on each of the products. The total benefit obtained by Samuel through discounts is calculated by finding out the difference in the actual price of the product and the discounted price of the product. This is shown on the Y axis of the graph. The X axis of the graph represents the products which Samuel can purchase. In this case, Samuel will purchase product ____ as an optimal product.
Answer: Samuel will purchase product 2 as an optimal product. Samuel will purchase that product which will maximize his total benefit. That is, the optimal product is the product which gives him the highest Total benefit. In the graph when Samuel buys product 1, he gets a total benefit of 4. When he buys product 2, he gets a total benefit of 5. When he buys product 3, the total benefit he gets is 2. And when he buys product 4, his total benefit is 3. Therefore, he gets the maximum Total benefit of 5 when he buys product 2. Thus the answer is: product 2.
Which of the following statements regarding marginal analysis is true? A.If total cost is falling, marginal cost could be zero. B.If total cost is rising, marginal cost could be falling. C.If total cost is rising, marginal cost must be rising. D.If total cost is falling, marginal cost must be positive.
B.If total cost is rising, marginal cost could be falling.
Since optimization is used to analyze people's choices and help them improve the outcomes of their choices, its A. normative only. B.both normative and positive. C.positive only. D.neither because it describes preferences but not how to improve themdescribes preferences but not how to improve them
B.both normative and positive.
Marginal analysis is a cost-benefit calculation that A.analyzes the marginal revenue at points on the demand curve. B.focuses on the similarities between one feasonable alternative and the next feasible alternative. C.analyzes the marginal costs at points on the demand curve. D.focuses on the differences between one feasonable alternative and the next feasible alternative.
D.focuses on the differences between one feasonable alternative and the next feasible alternative.
You and your friend, Jim, have just moved out of your dorm and into a new apartment. Both of you decide that you need to get a couch. Jim thinks you should get a new one from a furniture store nearby. You feel that, given your budget, it is best to buy a used one. Your other options are to buy one online or get a couch custom-made at the same furniture store. How would you arrive at an optimal solution here? Assume that your opportunity cost of time is $5 per hour. You and Jim would need to consider ___________. A.the indirect costs of traveling to the furniture store and the opportunity cost of your time required to shop. B.only the marginal benefit of each couch. C.the direct costs of the price of each couch and the cost of having each couch moved to your apartment. D.the direct costs and the indirect opportunity cost of your time required to shop. E.only the price of each couch.
D.the direct costs and the indirect opportunity cost of your time required to shop.
Suppose apartments are in four locations: Location A, Location B, Location C, and Location D. Location A is in the city, where your job is. Location B is 10 minutes farther from your job than Location A. Location C is 10 minutes farther from your job than Location B, and Location D is 10 minutes farther than Location C. In turn, similar apartments in Location B rent for $115115 less per month than apartments in Location A, apartments in Location C rent for $115115 less than in Location B, and apartments in Location D rent for $115115 less than in Location C. Suppose the value of your time is $2020 per hour and you work 21 days per month, with each day requiring a round-trip commute from your apartment to work. For simplicity, assume rent and the opportunity cost of your time commuting to work are the only factors influencing the location in which to rent an apartment. You should rent an apartment in_______________. Suppose you currently rent an apartment in Location Upper C Location C. By moving to optimize, you change your net benefit by $______. (Enter your response as an integer.)
Location A.: 50
Which of the following statements regarding the principle of optimization is true? (Check all that apply.) A. It applies only in the case of monetary and financial matters. B. It is the unifying principle that connects various seemingly unrelated decisions. C. It means always choosing the best feasible option. D. It takes into account and evaluates multiple trade-offs. In which of the following situations is optimization a good description of behavior? A.Tia is a very fun loving person. She chooses to go on a vacation with friends instead of volunteering at NGO as a vacation is more enjoyable. Your answer is correct. B.Kat, the MIT business management graduate, starts his first business and incurs huge financial losses despite graduating from MIT. C.Rita watches movies late at night. The next day, she wakes up late causing her to be late to her exam. D.John is careless and irresponsible causing him to make a lot of mistakes in his work.
Part 1 D and B; part 2 A.Tia is a very fun loving person. She chooses to go on a vacation with friends instead of volunteering at NGO as a vacation is more enjoyable. Optimization means picking the best feasible option, given the available information. Economists believe that optimization describes, or at least approximates, many of the choices economic agents make. However, economists don't take optimization for granted. Several special situations are associated with behavior that is not optimal. For example, when people have self-control problemslong dash—like being careless and irresponsible or not being punctuallong dash—optimization is not a good description of behavior as in the case of John and Rita. People also tend to fail as optimizers when they are new to a task as in the case of Kat. Consequently, optimization is a better description of choices when people have lot of experience. Tia has two feasible options to choose from: to go on a vacation or volunteering at an NGO. As she is a very fun loving person, she chooses the option that is more enjoyable for her. Therefore, in her case optimization is a good description of the behavior.
You have the option to play tennis or a round of golf (but not both). The tennis match requires you to take 2 hours off from work and the round of golf requires you to take 4 hours off from work. Playing tennis has value to you equal to $70, while golf has value to you equal to $95. Tennis courts are publicly available at no cost, but golf costs $30 per round. Suppose your wage from working is $10 per hour. The net benefit from playing tennis is $50 and the net benefit from playing golf is $25. (Enter your responses as integers.) Therefore, you should play tennis.
Tennis=> 2 hours x 10 per hour=$20 $70-$20= $50 Golf=> 4hours x 10 per hour=$40 $95-$30-$40=$25 You should play tennis because it has a higher value to you.
When John determines what choice of walking shoes will give him the best bang for his buck, he is using optimization based on total value . When Janet looks at the additional value of purchasing a new laptop to the cost as compared to keeping her old one, she is using optimization based on marginal analysis .
Total value; Marginal analysis
When optimizing for total value, opportunity cost must be added to total cost. Assuming equal benefits, the lowest cost option is the optimal choice.
added to; equal
When you optimize in __________ you evaluate the change in utility that would result from selecting one option over another option. differences levels benefits
differences